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Loading file "m010__sl3_c0.magma" ==TRIANGULATION=BEGINS== % Triangulation m010 geometric_solution 2.66674478 oriented_manifold CS_known 0.0000000000000000 1 0 torus 0.000000000000 0.000000000000 3 1 2 1 2 0132 0132 2310 1023 0 0 0 0 0 -1 1 0 -1 0 0 1 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 -1 0 0 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.500000000000 1.322875655532 0 0 2 2 0132 3201 3201 0132 0 0 0 0 0 0 0 0 1 0 0 -1 0 -1 0 1 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 0 1 -1 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.375000000000 0.330718913883 1 0 1 0 2310 0132 0132 1023 0 0 0 0 0 1 0 -1 -1 0 1 0 0 0 0 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 -1 0 0 1 0 0 0 0 0 1 -1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0.500000000000 1.322875655532 ==TRIANGULATION=ENDS== PY=EVAL=SECTION=BEGINS=HERE {'variable_dict' : (lambda d, negation = (lambda x:-x): { 'c_1020_2' : d['c_0102_1'], 'c_1020_0' : d['c_0120_2'], 'c_1020_1' : d['c_0120_2'], 'c_0201_0' : d['c_0201_0'], 'c_0201_1' : d['c_0120_2'], 'c_0201_2' : d['c_0201_0'], 'c_2100_0' : d['c_0012_0'], 'c_2100_1' : d['c_0012_1'], 'c_2100_2' : d['c_0012_1'], 'c_2010_2' : d['c_0120_2'], 'c_2010_0' : d['c_0102_1'], 'c_2010_1' : d['c_0102_1'], 'c_0102_0' : d['c_0102_0'], 'c_0102_1' : d['c_0102_1'], 'c_0102_2' : d['c_0102_0'], 'c_1101_0' : d['c_1011_1'], 'c_1101_1' : negation(d['c_0111_2']), 'c_1101_2' : d['c_1101_2'], 'c_1200_2' : d['c_0012_0'], 'c_1200_0' : d['c_0012_1'], 'c_1200_1' : d['c_0012_0'], 'c_1110_2' : negation(d['c_1110_0']), 'c_1110_0' : d['c_1110_0'], 'c_1110_1' : d['c_1101_2'], 'c_0120_0' : d['c_0102_1'], 'c_0120_1' : d['c_0102_0'], 'c_0120_2' : d['c_0120_2'], 'c_2001_0' : d['c_0120_2'], 'c_2001_1' : d['c_0102_0'], 'c_2001_2' : d['c_0102_1'], 'c_0012_2' : d['c_0012_1'], 'c_0012_0' : d['c_0012_0'], 'c_0012_1' : d['c_0012_1'], 'c_0111_0' : d['c_0111_0'], 'c_0111_1' : negation(d['c_0111_0']), 'c_0111_2' : d['c_0111_2'], 'c_0210_2' : d['c_0102_1'], 'c_0210_0' : d['c_0120_2'], 'c_0210_1' : d['c_0201_0'], 'c_1002_2' : d['c_0120_2'], 'c_1002_0' : d['c_0102_1'], 'c_1002_1' : d['c_0201_0'], 'c_1011_2' : negation(d['c_1011_0']), 'c_1011_0' : d['c_1011_0'], 'c_1011_1' : d['c_1011_1'], 'c_0021_0' : d['c_0012_1'], 'c_0021_1' : d['c_0012_0'], 'c_0021_2' : d['c_0012_0']})} PY=EVAL=SECTION=ENDS=HERE PRIMARY_DECOMPOSITION_TIME: 0.480 PRIMARY=DECOMPOSITION=BEGINS=HERE [ Ideal of Polynomial ring of rank 13 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0102_0, c_0102_1, c_0111_0, c_0111_2, c_0120_2, c_0201_0, c_1011_0, c_1011_1, c_1101_2, c_1110_0 Inhomogeneous, Dimension 1, Radical, Prime Groebner basis: [ t*c_0201_0^5 - 22/3*t*c_0201_0^4*c_1110_0 - 8*t*c_0201_0^3*c_1110_0 - 4*t*c_0201_0^3 - 4/3*t*c_0201_0^2 + 32/3*c_1110_0 + 16/3, c_0012_0 - 1, c_0012_1 - 3*c_0201_0*c_1110_0 - 2*c_1110_0 - 1, c_0102_0 - c_0201_0, c_0102_1 + c_0201_0*c_1110_0 + 2*c_1110_0 + 1, c_0111_0 - 1, c_0111_2 - 2*c_1110_0 - 1, c_0120_2 + 2*c_0201_0*c_1110_0 + c_0201_0 + 1, c_1011_0 + c_1110_0, c_1011_1 - 2*c_1110_0 - 1, c_1101_2 - 1, c_1110_0^2 + 1/2*c_1110_0 + 1/4 ], Ideal of Polynomial ring of rank 13 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0102_0, c_0102_1, c_0111_0, c_0111_2, c_0120_2, c_0201_0, c_1011_0, c_1011_1, c_1101_2, c_1110_0 Inhomogeneous, Dimension 1, Radical, Prime Groebner basis: [ t*c_0201_0^5 - 11/3*t*c_0201_0^4 + 4*t*c_0201_0^3 - 4/3*t*c_0201_0^2 - 16/3, c_0012_0 - 1, c_0012_1 - 3/2*c_0201_0 + 1, c_0102_0 - c_0201_0, c_0102_1 + 1/2*c_0201_0 - 1, c_0111_0 - 1, c_0111_2 + 1, c_0120_2 - c_0201_0 + 1, c_1011_0 + 1/2, c_1011_1 + 1, c_1101_2 - 1, c_1110_0 - 1/2 ], Ideal of Polynomial ring of rank 13 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0102_0, c_0102_1, c_0111_0, c_0111_2, c_0120_2, c_0201_0, c_1011_0, c_1011_1, c_1101_2, c_1110_0 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 2 Groebner basis: [ t - 5/2*c_1110_0 - 1/2, c_0012_0 - 1, c_0012_1 - 1, c_0102_0 + c_1110_0 - 3/2, c_0102_1 - c_1110_0 + 1/2, c_0111_0 - 1, c_0111_2 + 1, c_0120_2 - c_1110_0 + 1/2, c_0201_0 + c_1110_0 - 3/2, c_1011_0 - c_1110_0, c_1011_1 - 1, c_1101_2 + 1, c_1110_0^2 - 1/2*c_1110_0 + 1/2 ], Ideal of Polynomial ring of rank 13 over Rational Field Order: Lexicographical Variables: t, c_0012_0, c_0012_1, c_0102_0, c_0102_1, c_0111_0, c_0111_2, c_0120_2, c_0201_0, c_1011_0, c_1011_1, c_1101_2, c_1110_0 Inhomogeneous, Dimension 0, Radical, Prime Size of variety over algebraically closed field: 4 Groebner basis: [ t + 10*c_1110_0^3 + 2, c_0012_0 - 1, c_0012_1 - 4*c_1110_0^3 + 2*c_1110_0^2 + c_1110_0 - 1, c_0102_0 + 6*c_1110_0^3 - 3*c_1110_0^2 - 1/2*c_1110_0 + 3, c_0102_1 - 2*c_1110_0^3 - c_1110_0^2 + 1/2*c_1110_0 - 1/2, c_0111_0 - 1, c_0111_2 + 4*c_1110_0^3 - 2*c_1110_0^2 - c_1110_0 + 1, c_0120_2 + 4*c_1110_0^3 + 3/2, c_0201_0 + 6*c_1110_0^3 - 3*c_1110_0^2 - 1/2*c_1110_0 + 3, c_1011_0 - c_1110_0, c_1011_1 - 4*c_1110_0^3 + 2*c_1110_0^2 + c_1110_0 - 1, c_1101_2 + 1, c_1110_0^4 + 1/2*c_1110_0^3 - 1/4*c_1110_0^2 + 1/4*c_1110_0 + 1/4 ] ] PRIMARY=DECOMPOSITION=ENDS=HERE FREE=VARIABLES=IN=COMPONENTS=BEGINS=HERE [ [ "c_0201_0" ], [ "c_0201_0" ], [ ], [ ] ] FREE=VARIABLES=IN=COMPONENTS=ENDS=HERE CPUTIME: 0.480 Total time: 0.670 seconds, Total memory usage: 32.09MB